Integer Solutions
of
a1h
+ a2h + a3h
+ a4h+ a5h
= b1h + b2h
+ b3h + b4h
+ b5h
( h = 1, 2, 3, 4,
6 )
- A.Golden [5]
gave solutions of this type by starting with the non-symmetric
solutions of the system ( k = 1, 2, 3, 4 )
.
- [ -23, -10, -5, 14, 24 ] = [ -21, -16, 2, 10,
25 ]
- The following solutions are obtained by Chen
Shuwen using Golden's method.
- [ -17, -5, -4, 12, 14 ] = [ -16, -10, 3, 7, 16 ]
- [ -19, -7, -6, 12, 20 ] = [ -16, -15, 2, 8, 21 ]
- [ -72, -32, -7, 53, 58 ] = [ -67, -47, 18, 28, 68 ]
- [ -21, -8, -2, 15, 16 ] = [ -20, -12, 6, 7, 19 ]
- [ -25, -16, 2, 18, 21 ] = [ -24, -18, 5, 14, 23 ]
Last revised March,31, 2001.
Copyright 1997-2001, Chen Shuwen